Electric Flux
where E is the magnitude of the electric field (having units of V/m), A is the area of the surface, and θ is the angle between the electric field lines and the normal (perpendicular) to A.
Note: That that an area element should be treated as a vector. It has a magnitude and also a direction. How to specify the direction of a planar area? Clearly, the normal to the plane specifies the orientation of the plane. Thus, the direction of a planar area vector is along its normal.
But a normal can point in two directions. Which direction do we choose as the direction of the vector associated with the area element?
Conventionally, the vector associated with every area element of a closed surface is taken to be in the direction of the outward normal.
In above diagram, note that:
Q.1. An electric field of 500 V/m makes an angle of 30.00 with the surface vector. It has a magnitude of 0.500 m2. Find the electric flux that passes through the surface.
Ans. The electric flux which is passing through the surface is given by the equation as:
ΦE = E.A = EA cos θ
ΦE = (500 V/m) (0.500 m2) cos 30°
ΦE = 217 Vm
Notice: That the unit of electric flux is a volt-times meter.
Q.2. Consider a uniform electric field E = 3 × 103 î N/C. What is the flux of this field through a square of 10 cm on a side whose plane is parallel to the yz plane?
(a) 30 Nm2/C
(b) 40 Nm2/C
(c) 50 Nm2/C
(d) 60 Nm2/C
Ans. (a)
Solution.
The flux of an electric field is given by,
ϕ = EA ⇒ ϕ = 3 × 103 × 0.1 × 0.1 ⇒ ϕ
= 30 Nm2/C
Therefore, the flux of the field through a square of 10 cm on a side whose plane is parallel to the yz plane is 30 Nm2/C
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